Responses 2,520≥15b 2,520 greater-than-or-equal-to 15 b 2,520 15b 2,520 greater than 15 b 2,520≤15b 2,520 less-than-or-equal-to 15 b Skip to navigation

A packing box with a height of 15 inches needs to contain more than 2,520 in.3 . How would you model this situation with an inequality to show the possible area, b , of the base of the box?(1 point)

Responses

2,520≥15b
2,520 greater-than-or-equal-to 15 b

2,520<15b
2,520 less than 15 b

2,520>15b
2,520 greater than 15 b

2,520≤15b
2,520 less-than-or-equal-to 15 b
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The base of a parallelogram is 0.7 m. The area must be no more than 0.63 m2 . How would you write an inequality to show the possible height of the parallelogram?(1 point)

Responses

0.7>0.63h
0.7 greater than 0.63 h

0.63>0.7h
0.63 greater than 0.7 h

0.63≥0.7h
0.63 greater-than-or-equal-to 0.7 h

0.7≥0.63h
0.7 greater-than-or-equal-to 0.63 h
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page 13 of 13

0.63 ≥ 0.7h

3 of 53 of 5 Items

Question
Use the image to answer the question.

An illustration shows a labeled parallelogram. The lines on the top on the right and left sides extend past where the parallelogram ends. The left side is labeled Maple Street. The right side is labeled Oak Street. The base measures 45 meters. The label A is greater than 2,700 meters squared is placed inside of the parallelogram. A perpendicular dashed line is drawn from the top to bottom right corner and is labeled h.

A park is being laid out in the shape of a parallelogram between Maple and Oak Streets, which are 45 meters apart. The park must have an area of at least 2,700 m2 . What is the solution of an inequality for the possible value of h , the height of the parallelogram?

(1 point)
Responses

h≤60 m
h less-than-or-equal-to 60 m

h≥60 m
h greater-than-or-equal-to 60 m

h>60 m
h greater than 60 m

h<60 m
h less than 60 m
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page 13 of 13

h≥60 m

A pillbox with a height of 12 inch needs to have a volume greater than 2 in.3 . What is the solution of an inequality describing the possible area of the base, b ?(1 point)

Responses

b>112 in.2
b greater than 1 Start Fraction 1 over 2 End Fraction in. squared

b>212 in.2
b greater than 2 Start Fraction 1 over 2 End Fraction in. squared

b>1 in.2
b greater than 1 in. squared

b>4 in.2
b greater than 4 in. squared
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page 13 of 13

b > 2 in.²

pick one of the answers

b > 2 in.²

A postage stamp is being designed with a height of 112 inches. The area must be no greater than 118 in.2. What is the solution to an inequality that describes the possible width of the stamp?(1 point)

Responses

w≤34 in.
w less-than-or-equal-to Start Fraction 3 over 4 End Fraction in.

w≤258 in.
w less-than-or-equal-to 2 Start Fraction 5 over 8 End Fraction in.

w<34 in.
w less than Start Fraction 3 over 4 End Fraction in.

w≤38 in.
w less-than-or-equal-to Start Fraction 3 over 8 End Fraction in.
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page 13 of 13

A packing box with a height of 15 inches needs to contain more than 2,520 in.3 . How would you model this situation with an inequality to show the possible area, b , of the base of the box?(1 point)

The base of a parallelogram is 0.7 m. The area must be no more than 0.63 m2 . How would you write an inequality to show the possible height of the parallelogram?(1 point)

0.63 ≥ 0.7h

3 of 53 of 5 Items

h≥60 m

A pillbox with a height of 12 inch needs to have a volume greater than 2 in.3 . What is the solution of an inequality describing the possible area of the base, b ?(1 point)

b > 2 in.²

pick one of the answers

b > 2 in.²

A postage stamp is being designed with a height of 112 inches. The area must be no greater than 118 in.2. What is the solution to an inequality that describes the possible width of the stamp?(1 point)

w ≤ 34 in.